Multi-level control of fuzzy-constraint propagation in inference based on α-cuts and generalized mean

Kiyohiko Uehara, Kaoru Hirota

Research output: Contribution to journalArticlepeer-review

9 Citations (Scopus)

Abstract

An inference method is proposed, which can perform nonlinear mapping between convex fuzzy sets and present a scheme of various fuzzy-constraint propagation from given facts to deduced consequences. The basis of nonlinear mapping is provided by α- GEMII (α-level-set and generalized-mean-based inference) whereas the control of fuzzy-constraint propagation is based on the compositional rule of inference (CRI). The fuzzy-constraint propagation is controlled at the multi-level of α in its α-cut-based operations. The proposed method is named α-GEMS (a-level-set and generalized-mean-based inference in synergy with composition). Although a-GEMII can perform the nonlinear mapping according to a number of fuzzy rules in parallel, it has limitations in the control of fuzzy-constraint propagation and therefore has difficulty in constructing models of various given systems. In contrast, CRI-based inference can rather easily control fuzzy-constraint propagation with high understandability especially when a single fuzzy rule is used. It is difficult, however, to perform nonlinear mapping between convex fuzzy sets by using a number of fuzzy rules in parallel. α-GEMS can solve both of these problems. Simulation results show that a- GEMS is performed well in the nonlinear mapping and fuzzy-constraint propagation. α-GEMS is expected to be applied to modeling of given systems with various fuzzy input-output relations.

Original languageEnglish
Pages (from-to)647-662
Number of pages16
JournalJournal of Advanced Computational Intelligence and Intelligent Informatics
Volume17
Issue number4
DOIs
Publication statusPublished - Jul 2013
Externally publishedYes

Keywords

  • Compositional rule of inference
  • Convex fuzzy set
  • Fuzzy inference
  • Implication
  • α-cut

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